Add to ORKGAbstract. This survey on flexible Weinstein manifolds is, essentially, an extract from the book [4]. 1
This book is essential reading for anyone interested in low-dimensional topology
We study invariants defined by count of charged, elliptic $J$-holomorphic curves in locally conforma...
On decrit ici des relations entre la geometrie globale des varietes de contact closes et celle de ce...
Abstract. This survey on the topology of Stein manifolds is an extract from the book [7]. It is comp...
Cover topics including induction and reduction for systems with symmetry, symplectic geometry and to...
A beautiful and comprehensive introduction to this important field. -Dusa McDuff, Barnard College, C...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
AbstractA surface in a smooth 4-manifold is called flexible if, for any diffeomorphism ϕ on the surf...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
This Article is brought to you for free and open access by the Department of Mathematics at OpenSIUC...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
The Floer theory of a cotangent fiber in a symplectic cotangent bundle T*M can be understood via the...
Geometric Topology can be defined to be the investigation of global properties of a further structur...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...
Let M be a finite-dimensional differentiable manifold. We will denote the space of smooth vector fie...
This book is essential reading for anyone interested in low-dimensional topology
We study invariants defined by count of charged, elliptic $J$-holomorphic curves in locally conforma...
On decrit ici des relations entre la geometrie globale des varietes de contact closes et celle de ce...
Abstract. This survey on the topology of Stein manifolds is an extract from the book [7]. It is comp...
Cover topics including induction and reduction for systems with symmetry, symplectic geometry and to...
A beautiful and comprehensive introduction to this important field. -Dusa McDuff, Barnard College, C...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
AbstractA surface in a smooth 4-manifold is called flexible if, for any diffeomorphism ϕ on the surf...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2019Cataloged from...
This Article is brought to you for free and open access by the Department of Mathematics at OpenSIUC...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
The Floer theory of a cotangent fiber in a symplectic cotangent bundle T*M can be understood via the...
Geometric Topology can be defined to be the investigation of global properties of a further structur...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...
Let M be a finite-dimensional differentiable manifold. We will denote the space of smooth vector fie...
This book is essential reading for anyone interested in low-dimensional topology
We study invariants defined by count of charged, elliptic $J$-holomorphic curves in locally conforma...
On decrit ici des relations entre la geometrie globale des varietes de contact closes et celle de ce...